Add to ORKGIn this talk we are going to describe Sz´az’s construction of some class of metric spaces. Most of all we will analyze topological properties of metric spaces obtained by using Sz´az’s construction. In particular, we provide necessary and sufficient conditions for completeness of metric spaces obtained in this way. Moreover, we will discuss the relation between Sz´az’s construction and the “linking construction”. A particular attention will be drawn to the “floor” metric, the analysis of which provides some interesting observations
Abstract. Two equivalent metrics can be compared, with respect to their uniform properties, in sever...
The classical Cantor's intersection theorem states that in a complete metric space $X$, intersection...
Following Lawvere, a generalized metric space (gms) is a set X equipped with a metric map from X2 to...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
We discuss domestic affairs of metric spaces, keeping away from any extra structure. Topics include ...
An example of a D-metric space is given, in which D-metric convergence does not define a topology an...
© 2018, Pleiades Publishing, Ltd. In the present paper we obtain new metric invariants of metric spa...
The main purpose of this paper is to introduce several concepts of the metric-like spaces. For insta...
summary:A metric space $\langle X,d\rangle$ is called a $\operatorname{UC}$ space provided each cont...
[EN] Given a continuous nonnegative functional λ that makes sense defined on an arbitrary metric spa...
In this thesis we present an overview of some important known facts related to topology, geometry a...
Summary. In this paper we define the metric spaces. Two examples of metric spaces are given. We defi...
The study of metric spaces is closely related to the study of topology in that the study of metric s...
We use countable metric spaces to code Polish metric spaces and evaluate the complexity of some stat...
In this thesis we start off by ensuring that the reader is up to speed when it comes to some well kn...
Abstract. Two equivalent metrics can be compared, with respect to their uniform properties, in sever...
The classical Cantor's intersection theorem states that in a complete metric space $X$, intersection...
Following Lawvere, a generalized metric space (gms) is a set X equipped with a metric map from X2 to...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
We discuss domestic affairs of metric spaces, keeping away from any extra structure. Topics include ...
An example of a D-metric space is given, in which D-metric convergence does not define a topology an...
© 2018, Pleiades Publishing, Ltd. In the present paper we obtain new metric invariants of metric spa...
The main purpose of this paper is to introduce several concepts of the metric-like spaces. For insta...
summary:A metric space $\langle X,d\rangle$ is called a $\operatorname{UC}$ space provided each cont...
[EN] Given a continuous nonnegative functional λ that makes sense defined on an arbitrary metric spa...
In this thesis we present an overview of some important known facts related to topology, geometry a...
Summary. In this paper we define the metric spaces. Two examples of metric spaces are given. We defi...
The study of metric spaces is closely related to the study of topology in that the study of metric s...
We use countable metric spaces to code Polish metric spaces and evaluate the complexity of some stat...
In this thesis we start off by ensuring that the reader is up to speed when it comes to some well kn...
Abstract. Two equivalent metrics can be compared, with respect to their uniform properties, in sever...
The classical Cantor's intersection theorem states that in a complete metric space $X$, intersection...
Following Lawvere, a generalized metric space (gms) is a set X equipped with a metric map from X2 to...